Partially ordered space

In mathematics, a partially ordered space^[1] (or pospace) is a topological space $X$ equipped with a closed partial order $\leq$ , i.e. a partial order whose graph $\{(x,y)\in X^{2}\mid x\leq y\}$ is a closed subset of $X^{2}$ .

From pospaces, one can define dimaps, i.e. continuous maps between pospaces which preserve the order relation.

Equivalences[]

For a topological space $X$ equipped with a partial order $\leq$ , the following are equivalent:

$X$ is a partially ordered space.
For all $x,y\in X$ with $x\not \leq y$ , there are open sets $U,V\subset X$ with $x\in U,y\in V$ and $u\not \leq v$ for all $u\in U,v\in V$ .
For all $x,y\in X$ with $x\not \leq y$ , there are disjoint neighbourhoods $U$ of $x$ and $V$ of $y$ such that $U$ is an upper set and $V$ is a lower set.

The order topology is a special case of this definition, since a total order is also a partial order.

Properties[]

Every pospace is a Hausdorff space. If we take equality $=$ as the partial order, this definition becomes the definition of a Hausdorff space.

Since the graph is closed, if $\left(x_{\alpha }\right)_{\alpha \in A}$ and $\left(y_{\alpha }\right)_{\alpha \in A}$ are nets converging to x and y, respectively, such that $x_{\alpha }\leq y_{\alpha }$ for all $\alpha$ , then $x\leq y$ .

References[]

^ Gierz, G.; Hofmann, K. H.; Keimel, K.; Lawson, J. D.; Mislove, M.; Scott, D. S. (2009). "Continuous Lattices and Domains". doi:10.1017/CBO9780511542725. Cite journal requires |journal= (help)

Narici, Lawrence; Beckenstein, Edward (2011). Topological Vector Spaces. Pure and applied mathematics (Second ed.). Boca Raton, FL: CRC Press. ISBN 978-1584888666. OCLC 144216834.
Schaefer, Helmut H.; (1999). Topological Vector Spaces. GTM. 8 (Second ed.). New York, NY: Springer New York Imprint Springer. ISBN 978-1-4612-7155-0. OCLC 840278135.

External links[]

ordered space on Planetmath

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[GierzHofmann2009-1] Gierz, G.; Hofmann, K. H.; Keimel, K.; Lawson, J. D.; Mislove, M.; Scott, D. S. (2009). "Continuous Lattices and Domains". doi:10.1017/CBO9780511542725. Cite journal requires |journal= (help)

[1]

v t Ordered topological vector spaces
Basic concepts	Ordered vector space Partially ordered space Riesz space Order topology Order unit Topological vector lattice Vector lattice
Types of orders/spaces	AL-space AM-space Archimedean Banach lattice Fréchet lattice Locally convex vector lattice Normed lattice Order bound dual Order dual Order complete Regularly ordered
Types of elements/subsets	Band Cone-saturated Lattice disjoint Dual/Polar cone Normal cone Order complete Order summable Order unit Quasi-interior point Solid set Weak order unit
Topologies/Convergence	Order convergence Order topology
Operators	Positive
Main results	Freudenthal spectral

Partially ordered space

Contents

Equivalences[]

Properties[]

See also[]

References[]

External links[]